Lp estimates for fractional schrodinger operators with kato class potentials

Abstract

Let α>0, H=(-)α+V(x), V(x) belongs to the higher order Kato class K2α(Rn). For 1≤ p≤ ∞, we prove a polynomial upper bound of \|e-itH(H+M)-β\|Lp, Lp in terms of time t. Both the smoothing exponent β and the growth order in t are almost optimal compared to the free case. The main ingredients in our proof are pointwise heat kernel estimates for the semigroup e-tH. We obtain a Gaussian upper bound with sharp coefficient for integral α and a polynomial decay for fractal α.